please answer this question :
the roots of ax^2+bx+c=0 where a is not equal to 0 and coefficients are real, are non real complex and a+c
a)4a+c<2b
b)4a+c>2b
c)4a+c=2b
d)none of these
It seems a+c<b is a wrong condition. In that case, b^2 -4ac >0 and the roots will be real. it is said that roots are imaginary. it should be a+c > b. It implies that b^2 - 4ac < 0.
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roots of a x^2 + b x + c = 0 are [ -b + - sqroot(b^2 - 4 a c) ] / 2
they are non real and complex. Hence b^2 < 4 a c. --- equation 1
we know that a square of a real number is always non negative,
So (4a - c)^2 >= 0
=> 16a^2 + c^2 >= 8 a c -- eq 2
Now find (4 a + c)^2 = 16 a^2 + c^2 + 8 a c
>= 8 a c + 8 a c --- by eq 2
> 4 * b^2 --- by eq 1
take square roots on both sides
Hence 4 a + c > 2 b
they are non real and complex. Hence b^2 < 4 a c. --- equation 1
we know that a square of a real number is always non negative,
So (4a - c)^2 >= 0
=> 16a^2 + c^2 >= 8 a c -- eq 2
Now find (4 a + c)^2 = 16 a^2 + c^2 + 8 a c
>= 8 a c + 8 a c --- by eq 2
> 4 * b^2 --- by eq 1
take square roots on both sides
Hence 4 a + c > 2 b
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the roots of ax^2+bx+c=0 where a is not equal to 0 and coefficients are real, are non real complex and a+c<b then
a)4a+c<2b
b)4a+c>2b
c)4a+c=2b
d)none of these